Answer:
225,625
Explanation:
can be solved by utilizing the derivative. We have 55-x = price 4000+100x = number of customers price * number of customers = profit (55-x)(4000+100x) = profit Expanding, we get = 55*4000 + 55*100x - 4000x - 100x^2
We now want the maximum possible value of this. To do so, we use the derivative and set it equal to zero. d/dx (-100x^2 + 1500x + 220000) = -200x + 1500 = 0 200x = 1500 x = 7.5
Thus the price that yields max revenue is 55 - 7.5 = 47.50 dollars And the max revenue is (47.5)(4750) = 225,625
The maximum revenue is 225,625
55-x = price
4000+100x = number of customers
price × number of customers = profit
(55-x)(4000+100x) = profit
Now
= 55 ×4000 + 55 × 100x - 4000x - 100x^2
Here we applied derivates
d/dx (-100x^2 + 1500x + 220000) = -200x + 1500 = 0
200x = 1500
x = 7.5
Thus the price that yields max revenue is 55 - 7.5 = 47.50 dollars
Now
And the max revenue is (47.5)(4750) = 225,625
learn more: https://brainly.com/question/17429689?referrer=searchResults
